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Yayın Abstract book(Maltepe Üniversitesi, 2019) Çakallı, Hüseyin; Savaş, Ekrem; Sakallı, İzzet; Horgan, Jane; Daly, Charlie; Power, James; Kocinac, Ljubi^sa; Cavalanti, M. Marcelo; Corrˆea, Wellington J.; Özsarı, Türker; Sep´ulveda, Mauricio; Asem, Rodrigo V´ejar; Harte, Robin; Açıkgöz, Ahu; Esenbel, Ferhat; Jabor, Ali Ameer; Omran, Ahmed abd-Ali; Varol, Banu Pazar; Kanetov, Bekbolot; Baidzhuranova, Anara; Saktanov, Ulukbek; Kanetova, Dinara; Zhanakunova, Meerim; Liu, Chuan; Yıldırım, Esra Dalan; Şahin, Hakan; Altun, Ishak; Türkoğlu, Duran; Akız, Hürmet Fulya; Mucuk, Osman; Motallebi, Mohammad Reza; Demir, Serap; Şahan, Tunçar; Kelaiaia, Smail; Yaying, Taja; Noiri, Takashi; Vergili, Tane; Çetkin, Vildan; Misajleski, Zoran; Shekutkovski, Nikita; Durmishi, Emin; Berkane, Ali; Belhout, Mohamed; Es-Salih, Aries Mohammed; Sönmez, Ayşe; Messirdi, Bachir; Derhab, Mohammed; Khedim, Tewfik; Karim, Belhadj; Affane, Doria; Yarou, Mustapha Fateh; Yılmaz, Fatih; Sertbaş, Meltem; Bouchelaghem, Faycal; Ardjouni, Abdelouaheb; Djoudi, Ahcene; Çiçek, Gülseren; Mahmudov, Elimhan; El-Metwally, Hamdy A.; AL-kaff, M.; Mustafayev, Heybetkulu; Duru, Hülya; Biroud, KheireddineOn behalf of the Organizing Committee, we are very pleased to welcome you to the 3nd International Confer- ence of Mathematical Sciences (ICMS 2019) to be held between 4-8 September 2019 at Maltepe University in Istanbul. We hope that, ICMS 2019 will be one of the most beneficial scientific events, bringing together mathematicians from all over the world, and demonstrating the vital role that mathematics play in any field of science.Yayın Completion of cone metric spaces(Maltepe Üniversitesi, 2009) Çakallı, Hüseyin; Sönmez, AyşeIn case of ordinary metric spaces, completion of a metric space is well-known. In 2007, the concept of cone metric space was introduced by Huang Long-Guang and Zhang Xian. In this note, we construct completion of cone metric spaces, and prove that any cone metric space can be completed.Yayın Completion of cone normed spaces(Maltepe Üniversitesi, 2009) Çakallı, Hüseyin; Sönmez, AyşeIn case of ordinary normed spaces, completion of a normed space is well-known. In 2007, the concept of cone metric space was introduced by Huang Long-Guang and Zhang Xian. Recently Sonmez introduce the concept of cone normed space. In this note, we construct completion of cone normed spaces, and prove that any cone normed space can be completed.Yayın Cone normed spaces and weighted means(ScienceDirect, 2010) Sönmez, Ayşe; Çakallı, HüseyinIn this paper, we study the main properties of cone normed spaces, and prove some theorems of weighted means in cone normed spaces.Yayın Some topological properties of cone metric spaces(Maltepe Üniversitesi, 2009) Çakallı, Hüseyin; Sönmez, AyşeIn 2007, the concept of cone metric space was introduced by Huang Long-Guang and Zhang Xian. Recently Sönmez introduce the concept of cone normed space. Some topological properties of cone metric spaces was recently given by Türkoğlu, D. and Abuloha M. In this note, we give some more properties of cone metric spaces and prove related theorems.Yayın Statistical quasi Cauchy sequences in abstract metric spaces(Maltepe Üniversitesi, 2019) Sönmez, Ayşe; Çakallı, HüseyinIn this study, we introduce a concept of statistical quasi-Cauchyness of a sequences in a cone metric space in the sense that a sequence (xk) is statistically quasi-Cauchy if limn?? 1 n |{k ? n : d(xk+1, xk) ? c}| = 0 for each c ? P 0 . It turns out that a real valued function f is uniformly continuous either on a totally bounded subset of a cone metric space X or on a connected subset of X if f preserves statistical quasi-Cauchy sequencesYayın Statistically quasi Cauchy sequences in abstract metric spaces(Amer Inst Physics, 2019) Sönmez, Ayşe; Cakalli, HüseyinIn this extended abstract, we introduce a concept of statistically quasi-Cauchyness of a sequence in X in the sense that a sequence (x(k)) is statistically quasi -Cauchy in X if lim(n ->infinity) 1/n vertical bar{k <= n : d(x(k+1), x(k)) - c is an element of P}vertical bar for each c is an element of P where (X, d) is a cone metric space, and p denotes interior of a cone P of X. It turns out that a function f from a totally bounded subset A of X into X is uniformly continuous if f preserves statistically quasi-Cauchy sequences.Yayın ?-statistically ward continuity(Sciendo, 2017) Çakallı, Hüseyin; Sönmez, Ayşe; Gündüz Aras, ÇiğdemThe main object of this paper is to investigate Istatistically ward continuity. We obtain some relations between this kind of continuity and some other kinds of continuities. It turns out that any ?-statistically ward continuous real valued function on a ?-statistically ward compact subset E ? R is uniformly continuous. © 2017, Sciendo. All rights reserved.
